Consider this toy Coq problem (CollaCoq):

```
Require Import ssreflect ssrfun ssrbool.
Require Import Unicode.Utf8.
Definition optfun (n: nat) : option nat :=
match n with
| 0 => Some 0
| _ => None
end.
Definition boolfun (n: nat) : bool :=
match n with
| 0 => true
| _ => false
end.
Lemma lem : ∀ n, isSome (optfun n) = boolfun n.
Proof.
intro. unfold optfun, boolfun. destruct n.
```

My goal here was to have `boolfun`

be true whenever `optfun`

returns a Some, and to prove that in the lemma.

However, after the proof steps given, the current subgoal is `Some 0 = true`

.

I thought a proposition like that should not even type check because I'd expect `Some 0`

to be of type `option nat`

and `true`

to be of type `bool`

. Why does this happen? Is there something wrong with my `optfun`

, `boolfun`

or `lem`

?